# fastest way to find a given number 'n' can be absolutely expressed as 2^m [duplicate]

Possible Duplicate:
How to check if a number is a power of 2

fastest way to find a given number 'n' can be expressed as 2^m

ex: `16= 2^4`

naive solution: divide given number by 2 until the remainder becomes 0 (if successful) or less than two (if not successful)

Can someone tell me whats the other fastest way to compute this ?

## marked as duplicate by sdcvvc, Svante, gbn, Josh K, NullUserExceptionAug 15 '10 at 19:17

• Is this homework? – Gumbo Aug 15 '10 at 19:11
• +1 to counteract downvotes for no reason. – quantumSoup Aug 15 '10 at 19:15

Fastest way:

``````if (n != 0 && (n & (n - 1)) == 0)
``````

If the number is a power of two, it will be represented in binary as 1 followed by m zeroes. After subtracting 1, it will be just m ones. For example, take m=4 (n=16)

``````10000 binary = 16 decimal
01111 binary = 15 decimal
``````

Perform a bitwise "and" and you'll get 0. So it gives the right result in that case.

Now suppose that `n` is not exactly 2m for some m. Then subtracting one from it won't affect the top bit... so when you "and" together `n` and `n-1` the top bit will still be set, so the result won't be 0. So there are no false positives either.

EDIT: I originally didn't have the `n != 0` test... if n is zero, then `n & anything` will be zero, hence you get a false positive.

• And m is what? – Gumbo Aug 15 '10 at 19:11
• @Gumbo: I don't believe the question is about finding `m` - it's about determining whether there is such an integer `m`. I could be wrong though - it's not expressed very clearly. – Jon Skeet Aug 15 '10 at 19:14
• Zero is false positive. – sdcvvc Aug 15 '10 at 19:17
• @sdcwc: Good point. Will edit. – Jon Skeet Aug 15 '10 at 19:18
• That's a very nice trick, thanks! – shuhalo Aug 15 '10 at 19:23